Fractional step algorithm for solving a multi-dimensional diffusion-migration equation

In this paper an algorithm based on Adomian's decomposition method is developed to approximate the solution of the nonlinear fractional convection-diffusion equation The fractional derivative is considered in the Caputo sense. The approximate solutions are calculated in the form of a convergent ser

This paper proposes a fractional step method for the calculation of compressible Navier-Stokes equations. The purpose of this study is to develop a robust and efficient numerical method for the simulation of low Mach number flows in which the poorly distributed eigenvalues usually result in the nume

Conventional numerical methods for solving differential equations on a two-dimensional mesh are adapted to solving the one-group pile equation. The method yields the neutron density and the radial Laplacian in a standard manner which is not dependent on the number of control rods or other lattice ir